Thermodynamic processes

$${\displaystyle ds=C_v\frac{dT}{T}+R\frac{d\nu }{\nu }}$$

$${\displaystyle d\nu =\frac{\nu }{R}ds-C_v\frac{\nu }{RT}dT=\frac{\nu }{R}ds-\frac{C_v}{p}dT}$$

for an isentropic process (${\displaystyle ds=0}$), ${\displaystyle d\nu <0}$ for positive values of ${\displaystyle dT}$.

$${\displaystyle ds=C_p\frac{dT}{T}-R\frac{dp}{p}}$$

$${\displaystyle dp=-\frac{p}{R}ds+C_p\frac{p}{RT}dT=-\frac{p}{R}ds+C_p\rho dT}$$

for an isentropic process (${\displaystyle ds=0}$), ${\displaystyle dp>0}$ for positive values of ${\displaystyle dT}$.

Since ${\displaystyle \nu }$ decreases with temperature and pressure increases with temperature for an isentropic process, we can see from Eqn.~\ref{eqn:process:dnu} that ${\displaystyle d\nu }$ will be greater at lower temperatures and thus isochores (lines of constant specific volume) will be closely spaced at low temperatures and more sparse at higher temperatures. For an isochore ${\displaystyle dv=0}$ which implies

$${\displaystyle 0=\frac{\nu }{R}(ds-C_v\frac{dT}{T})\Rightarrow \frac{dT}{ds}=\frac{T}{C_v}}$$

and thus we can see that the slope of an isochore in a ${\displaystyle T-s}$-diagram is positive and that the slope increases with temperature.

In analogy, we can see that an isobar (${\displaystyle dp=0}$) leads to the following relation

$${\displaystyle 0=\frac{p}{R}(C_p\frac{dT}{T}-ds)\Rightarrow \frac{dT}{ds}=\frac{T}{C_p}}$$

and consequently isobars will also have a positive slope that increases with temperature in a ${\displaystyle T-s}$-diagram. Moreover, isobars are less steep than ischores as ${\displaystyle C_p>C_v}$.